On some nested floor functions and their jump discontinuities

Abstract

This paper investigates some particular limits involving nested floor functions. We'll prove some cases and then we'll show a more general result. Then we'll count the discontinuity points of those functions, and we'll prove a method to find them all. Surprisingly the set of the jump discontinuities of fn is a subset of the set of the jump discontinuities of fn+1, ∀ n∈Z+ where: \[ fn(x)= x x …n times \] Furthermore we'll give some generalizations of the result and lots of considerations; for example we'll prove that the cardinality of the set of the discontinuities of fn in a given limited interval approaches infinity as n∞.